On properness of moduli stacks of D×-shtukas over ramified legs

Abstract

Given a maximal order D of a central division algebra over a global function field F, we prove an explicit sufficient condition for moduli stacks of D×-shtukas to be proper over a finite field in terms of the local invariants of D and bounds. Our proof is a refinement of E.~Lau's result (Duke Math. J. 140 (2007)), which showed the properness of the leg morphism (or characteristic morphism) away from the ramification locus of D. We also establish non-emptiness of Newton and Kottwitz--Rapoport strata for moduli stacks of B×-shtukas, where B is a maximal order of a central simple algebra over F.